The generalized anisotropic dynamical Wentzell heat equation with nonstandard growth conditions

Abstract

The aim of this paper is to establish the solvability and global regularity theory for a new class of generalized anisotropic heat-type boundary value problems with (pure) dynamical anisotropic Wentzell boundary conditions. We first prove that the Wentzell operator with the above boundary conditions generates a nonlinear order-preserving submarkovian C0-semigroup \Tσ(t)\ over X\!\,r(·)():=Lr(·)()× Lr(·)() for all measurable functions r(·) on with 1≤ r-≤ r+<∞. Consequently, the corresponding anisotropic dynamical Wentzell problem is well-posed over X\!\,r(·)(). Furthermore, we show that the nonlinear C0-semigroup \Tσ(t)\ enjoys a H\"older-type ultracontractivity property in the sense that there exist constants C1,\,C2,\,>0, and γ∈(0,1), such that |\|Tσ(t)u0-Tσ(t)v0\||_∞\,≤\, C1\,eC2tt-|\|u0-v0\||γ_r(·),s(·) for every u0,\,v0∈X\!\,r(·),s(·)() and for all t>0.